Tagged Questions

Coq is an interactive theorem prover.

79 views

Applying an implication from a hypothesis

My coq proof currently looks like this: a0 : nat a1 : nat n : nat l : list nat c : nat -> nat -> bool H : forall a0 a1 a2 : nat, Is_true (c a0 a1) /\ Is_true (c a1 a2) -> Is_true (c a0 ...
249 views

Definition of a certified program

I see a couple of different research groups, and at least one book, that talk about using Coq for designing certified programs. Is there are consensus on what the definition of certified program is? ...
154 views

Boolean equality over natural numbers in Coq

Is it possible to compare two natural numbers, x and y, in Coq, and have the equality be returned as a boolean value? Ideally I would like to be able to do something like: Variable x : nat. Variable ...
97 views

Using List remove function

I'm trying to use the list remove function in Coq standard library but it asks for a bizarre typing and I don't know how to solve. The function I'm implementing is to make a list of free variables in ...
223 views

Implementing a Coq tactic in OCaml

I want to implement a tactic called solve, which can solve a linear equation expressed as a theorem. For example : Theorem leq : exists x , x + 3 = 2*x - 3 . Proof. solve. Qed. I want to implement ...
413 views

Coq: adding a “strong induction” tactic

"Strong" (or "complete") induction on the natural number means that when proving the induction step on n, you can assume the property holds for any k Theorem strong_induction: forall P : nat -> ...
206 views

Coq: How to add meaningful hints?

I am new to Coq and might be doing completely the wrong way. It seems to me that I need to choose between writing axioms/theorems that are nicely human-readable and axioms/theorems that are useful as ...
122 views

Lazy Evaluation Correctness and Totality (Coq)

As the title suggests, my question concerns proving the correctness and totality of lazy evaluation of arithmetic expressions in Coq. The theorems that I would like to prove are three in total: ...
107 views

Coq - induction on lists with a function applied to each element

Am trying to prove that applying a function f to every element of two lists results similar rel_list lists if they were originaly related. I have a rel on the elements of the list and have proved a ...
183 views

Write a tactic for prooving if two lists are permutations

I am a beginner and I would like to write a tactic for proving if two lists are permutations. For example, I would like to check the tactic with : Goal (Permutation (1::3::4::2::nil) ...
103 views

Coq - Induction over functions without losing information

I'm having some troubles in Coq when trying to perform case analysis on the result of a function (which returns an inductive type). When using the usual tactics, like elim, induction, destroy, etc, ...
184 views

Proof arguments in Coq

I'm trying to define a function on a weakly-specified type in Coq. Specifically, I have a type that is defined inductively by a set of recursive constructors, and I want to define a function that is ...
295 views

coq proof : tactic absurd, how does it works?

I am trying to understand a proof in coq. I wrote it long ago during a course but now I'm blocked by the absurd command. Here is the proof : Theorem Thm_2 : (~psi -> ~phi) -> (phi -> psi). ...
111 views

Coq - Error when eliminating OR

I don't know why, but in Coq, when trying to prove a program specification I get an error when trying to eliminate an OR hypothesis: Error: Cannot find the elimination combinator or_rec, the ...
195 views

Coq: how to apply one hypothesis to another

Assume I have two hypotheses in the context, a_b : A -> B and a : A. I should be able to apply a_b to a to gain a further hypothesis, b : B. That is, given the following state: 1 subgoal A : Prop ...
191 views

Coq “Error: No focused proof” when using “Arguments” command

I am working through the Software Foundations book. In the chapter on polymorphism, there is a section on "Implicit Arguments". In this section, there is the line: Arguments nil {X}. When I try to ...
297 views

Is the goal of natural deduction to prove that something is a tautology? [closed]

In our Software Verification module, we've just moved on from truth tables to natural deduction. Truth tables seemed pretty basic, but now we're using the coq theorm prover to prove more complex ...
239 views

COQ definition curry howard (A -> B -> C) -> (B -> A -> C) using sets

I've been staring this in the face for hours not understanding :( I need to solve some definitions using coq, and I am supposed to do it via the Curry Howard isomorphism. I have read up and still ...
105 views

Testing equal to 0%R with real numbers in Coq

I am trying to make a weighted tree library for some stuff I would like to do in Coq. Each edge of a tree should have a real number valued weight. One of the operations I want is a prune function ...
126 views

Subtyping polymorphism in Coq

I want to define a weighted tree with variable fan-out which is polymorphic over types. I came up with this: (* Weighted tree with topological ordering on the nodes. *) Inductive wtree (A : Type) : ...
99 views

Coq - I have to define a function that is only true if x and y are different, I also have to prove the definition

here is my attempt at defining diffb. diffb x y returns true, if x <> y and false otherwise. Definition diffb (b c : bool) : bool := match b, c with | true, false => true | false, true => ...
66 views

Coordinates in Coq

I apologize if this is obviously posted somewhere, but I have been trying Google search and SO search and found nothing on this yet. Part A. Is there a standard library for defining ...
166 views

Induction in Coq on a tree structure

This is a really elementary question, and I apologize, but I've been trying to use Coq to prove the following theorem, and just can't seem to figure out how to do it. (* Binary tree definition. *) ...
71 views

How to optimize a search in coq

I have a simple search function for a property that I am interested in, and a proof that the function is correct. I want to evaluate the function, and use the correctness proof to get the theorem for ...
134 views

How to apply a Coq hypothesis of the form A = B -> C = D to a subgoal of the form A = B

I'm working on a proof and I'm currently stuck at this. I have a hypothesis which reads: T1E : tree1 = EmptyTree -> isEmpty (leftChild (Node tree1 tree2)) = true I also have a hypothesis: H2 ...
169 views

Coq: How to prove “a=b -> nat_compare a b = Eq.”?

In an attempt to get a grasp what Coq is about, I ended up in a situation where I essentially need to prove that a=b -> nat_compare a b = Eq. I can get a handy start by doing: Coq < Theorem ...
219 views

Coq: Boolean Comparison of Integers

The natural numbers (nat) in coq have a function beq_nat, is there a similar function for integers Z (in ZArith)? And for the future, how can I find the answer to such questions without asking on ...
70 views

Is running time depend on the size of an input?

I have a parser function written in OCaml, then I have an input file is .xsd, the output is a Coq format. I tested my parser with two different input (.xsd), one has 60.2KB size and another has ...
85 views

Proofing Termination in Coq

How can I proof termination for size_prgm? I tried, but can't come up with a well founded relation to pass to Fix. Inductive Stmt : Set := | assign: Stmt | if': (list Stmt) -> (list Stmt) -> ...
77 views

I write a parser program (written in OCaml) that taking an input is a xsd and then generate it to Coq file. But it took a lot of time (~: 0m.0152s) to generate in the terminal. I would like to know ...
240 views

Proving structural equality of dependent records in Coq

I have defined a simple structure: Require Import Ensembles. Record ConfigStructure {T:Type} : Type := mkCS { E: Ensemble T; C: Ensemble (Ensemble T); CS_wf : forall x y, In _ C x -> In _ ...
120 views

Remove arrow in Emacs' ProofGeneral mode for Coq

I'm using ProofGeneral with Coq. When I do C-c C-return, Emacs highlights the area Coq has processed. This is nice. However, it inserts a '=>' on the next line, which overwrites the first two ...
66 views

Proving ~~(~~S -> S) in coq with only basic tactics

Is it possible to solve ~~(~~S -> S) in coq? I know you cant perform double negation elimination in intuitionistic logic but is this possible as you simply proving double negation on (~~S -> S) ...
56 views

Proofs about constructors matched with _

Assume I have the following Set: Inductive Many : Set := | aa: Many | bb: Many | cc: Many (* | ... many more constructors *) . How can I proof in the _ match, that y<>aa? match x with | aa ...
519 views

coq error when trying to use Case. Example from Software Foundations book

I am trying to learn Coq by working through the online Software Foundations book: http://www.cis.upenn.edu/~bcpierce/sf/ I'm using the interactive command line Coq interpreter coqtop. In the ...
211 views

How to get an induction principle for nested fix

I am working with a function that searches through a range of values. Require Import List. (* Implementation of ListTest omitted. *) Definition ListTest (l : list nat) := false. Definition ...
241 views

Double induction in Coq

Basically, I would like to prove that following result: Lemma nat_ind_2 (P: nat -> Prop): P 0 -> P 1 -> (forall n, P n -> P (2+n)) -> forall n, P n. that is the recurrence scheme ...
109 views

Coq, Pattern matching an Axiom with a wildcard

I was working with Coq, and I ran into some trouble trying to pattern match objects constructed with Axiom using a wildcard. I have created a minimal Coq program which demonstrates my problem. ...
272 views

How do you define an ordered pair in Coq?

I am a programmer, but an ultra-newbie to Coq, and have tried to figure out the tutorials without much success. My question is very simple: How does one define an ordered pair (of natural numbers) ...
153 views

Existential quantifier in coq impredicative logic (System F)

I was trying to code into Coq logical connectives encoded in lambda calculus with type à la System F. Here is the bunch of code I wrote (standard things, I think) Definition True := forall X: Prop, X ...
120 views

Just a universally quantified hypotesis in coq proof

Another hard goal (for me, of course) is the following: Goal ~(forall P Q: nat -> Prop, (exists x, P x) /\ (exists x, Q x) -> (exists x, P x /\ Q x)). Proof. I absolutely have no idea of ...
131 views

equivalent of `#use` directive from ocamltop in ocamldebug?

In ocamltop (after loading my file), I can run the following commands #cd "/afs/csail.mit.edu/u/j/jgross/coq-HoTT/";; #directory "/afs/csail.mit.edu/u/j/jgross/coq-HoTT/";; #directory ...
88 views

Coq arrow type in universal hypotesis with existential goal

I have the following theorem to prove: Goal (exists x, ~P x) <-> ~(forall x, P x). After a split unfold not. split. the first implication is very easy, basically we have to use the x ...
51 views

Coq - Universal quantifiers in hypoteses

I would like to prove the following theorem Goal (forall x, P x \/ Q x) -> (forall x, P x) \/ (forall x, Q x). with context 1 subgoal P : nat -> Prop Q : nat -> Prop R : nat -> nat ...
197 views

General recursion and induction in Coq

Let's suppose that I have type T wellfounded relation R: T->T->Prop function F1: T->T that makes argument "smaller" condition C: T->Prop that describes "start values" of R function F2: T->T that ...
199 views

A different way to do induction on lists that needs a proof

I have defined an inductive definition of lists (called listkind) in order make it easy for me to prove a specific theorem by induction on listkind rather than on list. Inductive listkind {X}: list X ...
301 views

Verified software toolchain: if-then-else proof

I'm learning using the Verified Software Toolchain (VST). I get stuck at proving a simple "if-then-else" block. Here is the .c file: int iftest(int a){ int r=0; if(a==2){ r=0; else{ ...
82 views

Is it possible to implement a derivative operator in COQ?

Is it possible to implement a derivative operator in COQ? That is, an operator that takes an algebraic function such as x^2 and returns its derivative; in that case, 2x.